We extend to the case of many competing densities the results of the paper [7]. More precisely, we are concerned with an optimal partition problem in N-dimensional domains related to the method of nonlinear eigenvalues introduced by Z. Nehari, [16]. We prove existence of the minimal partition and some extremality conditions. Moreover, in the case of two–dimensional domains we give an asymptotic formula near the multiple intersection points. Finally we show some connections between the variational problem and the behavior of competing species systems with large interaction. AMS Classification: 35J65 (58E05)
In Applied Mathematics, linear and nonlinear eigenvalue problems arise frequently when characterizin...
We consider the problem of minimizing over an affine set of square matrices the maximum of the real ...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...
AbstractWe extend to the case of many competing densities the results of the paper (Ann. Inst. H. Po...
We introduce a new numerical method to approximate partitions of a domain minimizing the sum of Diri...
Abstract. We deal with strongly competing multispecies systems of Lotka-Vol– terra type with homogen...
International audienceIn this paper we compare the candidates to be spectral minimal partitions for ...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Neuman...
We study the optimal partitioning of a (possibly unbounded) interval of the real line into n subinte...
In this paper we give an unified approach to some questions arising in different fields of nonlinear...
Abstract. In this paper we give an unified approach to some questions arising in different fields of...
International audienceIn this paper, we investigate an optimal design problem motivated by some issu...
In Applied Mathematics, linear and nonlinear eigenvalue problems arise frequently when characterizin...
Spatial segregation occurs in population dynamics when k species interact in a highly competitive wa...
International audienceIn this paper, we are interested in the analysis of a well-known free boundary...
In Applied Mathematics, linear and nonlinear eigenvalue problems arise frequently when characterizin...
We consider the problem of minimizing over an affine set of square matrices the maximum of the real ...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...
AbstractWe extend to the case of many competing densities the results of the paper (Ann. Inst. H. Po...
We introduce a new numerical method to approximate partitions of a domain minimizing the sum of Diri...
Abstract. We deal with strongly competing multispecies systems of Lotka-Vol– terra type with homogen...
International audienceIn this paper we compare the candidates to be spectral minimal partitions for ...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Neuman...
We study the optimal partitioning of a (possibly unbounded) interval of the real line into n subinte...
In this paper we give an unified approach to some questions arising in different fields of nonlinear...
Abstract. In this paper we give an unified approach to some questions arising in different fields of...
International audienceIn this paper, we investigate an optimal design problem motivated by some issu...
In Applied Mathematics, linear and nonlinear eigenvalue problems arise frequently when characterizin...
Spatial segregation occurs in population dynamics when k species interact in a highly competitive wa...
International audienceIn this paper, we are interested in the analysis of a well-known free boundary...
In Applied Mathematics, linear and nonlinear eigenvalue problems arise frequently when characterizin...
We consider the problem of minimizing over an affine set of square matrices the maximum of the real ...
We present a few results and a larger number of questions concerning partitions of graphs or hypergr...